Yan's theorem

In probability theory, Yan's theorem is a separation^{[disambiguation needed]} and existence result. It is of particular interest in financial mathematics where one uses it to prove the Kreps-Yan theorem.

The theorem was published by Jia-An Yan.^[1] It was proven for the L¹ space and later generalized by Jean-Pascal Ansel to the case ${\displaystyle 1\leq p<+\infty }$.^[2]

Yan's theorem

Notation:

${\displaystyle {\overline {\Omega }}}$  is the closure of a set ${\displaystyle \Omega }$ .

${\displaystyle A-B=\{f-g:f\in A,\;g\in B\}}$ .

${\displaystyle I_{A}}$  is the indicator function of ${\displaystyle A}$ .

${\displaystyle q}$  is the conjugate index of ${\displaystyle p}$ .

Statement

Let ${\displaystyle (\Omega ,{\mathcal {F}},P)}$  be a probability space, ${\displaystyle 1\leq p<+\infty }$  and ${\displaystyle B_{+}}$  be the space of non-negative and bounded random variables. Further let ${\displaystyle K\subseteq L^{p}(\Omega ,{\mathcal {F}},P)}$  be a convex subset and ${\displaystyle 0\in K}$ .

Then the following three conditions are equivalent:

1. For all ${\displaystyle f\in L_{+}^{p}(\Omega ,{\mathcal {F}},P)}$  with ${\displaystyle f\neq 0}$  exists a constant ${\displaystyle c>0}$ , such that ${\displaystyle cf\not \in {\overline {K-B_{+}}}}$ .
2. For all ${\displaystyle A\in {\mathcal {F}}}$  with ${\displaystyle P(A)>0}$  exists a constant ${\displaystyle c>0}$ , such that ${\displaystyle cI_{A}\not \in {\overline {K-B_{+}}}}$ .
3. There exists a random variable ${\displaystyle Z\in L^{q}}$ , such that ${\displaystyle Z>0}$  almost surely and

${\displaystyle \sup \limits _{Y\in K}\mathbb {E} [ZY]<+\infty }$ .

Literature

• Yan, Jia-An (1980). "Caracterisation d' une Classe d'Ensembles Convexes de ${\displaystyle L^{1}}$  ou ${\displaystyle H^{1}}$ ". Séminaire de probabilités de Strasbourg. 14: 220–222.
• Freddy Delbaen and Walter Schachermayer: The Mathematics of Arbitrage (2005). Springer Finance

References

1. Yan, Jia-An (1980). "Caracterisation d' une Classe d'Ensembles Convexes de ${\displaystyle L^{1}}$  ou ${\displaystyle H^{1}}$ ". Séminaire de probabilités de Strasbourg. 14: 220–222.
2. Ansel, Jean-Pascal; Stricker, Christophe (1990). "Quelques remarques sur un théorème de Yan". Séminaire de Probabilités XXIV, Lect. Notes Math. Springer.